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TRANSFORMATIONS

TRANSFORMATIONS. Gursharan Singh Tatla professorgstatla@gmail.com. Translation. x’= x + tx y’= y + ty The translation distance pair (tx,ty) is called a translation vector or shift vector P = x1 P’= x1’ T = tx

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TRANSFORMATIONS

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  1. TRANSFORMATIONS Gursharan Singh Tatla professorgstatla@gmail.com Gursharan Singh Tatla

  2. Translation x’= x + tx y’= y + ty The translation distance pair (tx,ty) is called a translation vector or shift vector P = x1 P’= x1’ T = tx x2 x2’ ty This allows us to write the two dimensional translation equations in the matrix form P’ = P + T Gursharan Singh Tatla

  3. Translation Illustration P’ P Gursharan Singh Tatla

  4. Rotation 1 (x’,y’) r θ (x,y) r Ф The original coordinates of the point in Polar Coordinates are X= r cos (Ф) y = r sin (Ф) Gursharan Singh Tatla

  5. Rotation 2 • x’ = r cos (Ф + θ) = r cos Ф cos θ – r sin Ф sin θ Y’ = r sin (Ф + θ) = r cos Ф sin θ + r sin Ф cos θ • x’ = x cos θ – y sin θ Y’ = x sin θ + y cos θ • P’ = R.P • R = cos θ - sin θ sin θ cos θ Gursharan Singh Tatla

  6. Rotation 3 • x’ = xr + (x – xr) cos θ – (y – yr) sin θ • Y’ = yr + (x – xr) sin θ + ( y – yr) cos θ (x’,y’) θ r (x,y) r Ф (xr,yr) Gursharan Singh Tatla

  7. Scaling 1 • X’ = x. sx y’ = y.sy x’ sx 0 x y’ 0 sy y • P’ = S . P Turning a square into a rectangle with scaling factors sx= 2 and sy =1.5 Gursharan Singh Tatla

  8. Scaling 2 Using sx= sy = 0.5 the line is reduced in size and moved closer to the origin p1 Scaling relative to a chosen fixed point (xf, yf) . Distances from each polygon vertex to the fixed point are scaled y transformation equations X’ = xf + (x- xf) sx Y’ = yf + (y-yf) sy p2 (xf,yf) p3 Gursharan Singh Tatla

  9. Transformations as Matrix operations • 0 tx • 0 1 ty • 0 0 1 X Y 1 X’ Y’ 1 = P’ = T ( tx , ty ) . P Translations Gursharan Singh Tatla

  10. Rotations P’= R(θ) .P X’ Y’ 1 Cosθ -Sinθ 0 Sinθ Cosθ 0 0 0 1 X Y 1 = Gursharan Singh Tatla

  11. Scaling P’= S(sx, sy) .P X’ Y’ 1 Sx 0 0 0 Sy 0 0 0 1 X Y 1 = Gursharan Singh Tatla

  12. Successive translations Successive translations are additive P’= T(tx1, ty1) .[T(tx2, ty2)] P = {T(tx1, ty1). T(tx2, ty2)}.P T(tx1, ty1). T(tx2, ty2) = T(tx1+tx2 , ty1 + ty2) 1 0 tx1+tx2 0 1 ty1+ty2 0 0 1 1 0 tx1 0 1 ty1 0 0 1 1 0 tx2 0 1 ty2 0 0 1 = Gursharan Singh Tatla

  13. Successive rotations • By multiplying two rotation matrices , we can verify that two successive rotations are additive P’= R(θ2) .{ R(θ1). P } = { R (θ2). R(θ1)}.P { R (θ2). R(θ1)} = R(θ1 + θ2) P’ = R(θ1 + θ2) . P Gursharan Singh Tatla

  14. Successive Scaling operations Sx1.sx2 0 0 0 sy1sy2 0 0 0 1 sx1 0 0 0 sy1 0 0 0 1 sx2 0 0 0 sy2 0 0 0 1 = S(sx2,sy2).S(sx1,sy1) = S(sx1.sx2 , sy1,sy2) The resulting matrix in this case indicates that successive scaling operations are multiplicative Gursharan Singh Tatla

  15. General pivot point rotation • Translate the object so that pivot-position is moved to the coordinate origin • Rotate the object about the coordinate origin • Translate the object so that the pivot point is returned to its original position (xr,yr) (d) Translation of the object so that the pivot point is returned to position (xr,yr) (b) Translation of object so that pivot point (xr,yr)is at origin (c) Rotation was about origin (a) Original Position of Object and pivot point Gursharan Singh Tatla

  16. General pivot point rotation cosθ -sinθ 0 sinθ cosθ 0 0 0 1 1 0 -xr 0 1 -yr 0 0 1 1 0 xr 0 1 yr 0 0 1 cosθ -sinθ xr(1- cosθ)+ yr sinθ sinθ cosθ yr(1- cosθ) - xr sinθ 0 0 1 = Can also be expressed as T(xr,yr).R(θ).T(-xr,-yr) = R(xr,yr,θ) Gursharan Singh Tatla

  17. General fixed point scaling • Translate object so that the fixed point coincides with the coordinate origin • Scale the object with respect to the coordinate origin • Use the inverse translation of step 1 to return the object to its original position (xf,yf) (b) Translation of object so that fixed point (xf,yf)is at origin (a) Original Position of Object and Fixed point (d) Translation of the object so that the Fixed point is returned to position (xf,yf) (c) scaling was about origin Gursharan Singh Tatla

  18. General pivot point Scaling sx 0 0 0 sy 0 0 0 1 1 0 -xf 0 1 -yf 0 0 1 1 0 xf 0 1 yf 0 0 1 sx 0 xf(1- sx) 0 sy yf(1- sy) 0 0 1 = Can also be expressed as T(xf,yf).S(sx,sy).T(-xf,-yf) = S(xf, yf, sx, sy) Gursharan Singh Tatla

  19. Transformations Properties • Concatenation properties A.B.C = (A.B).C = A.(B.C) Matrix products can be evaluated from left to right or from right to left • However they are not commutative A.B ≠ B.A • Hence one must be careful in order that the composite transformation matrix is evaluated Gursharan Singh Tatla

  20. Order of Transformations • Reversing the order in which a sequence of transformations is performed may effect the transformed position of an object. • In (a) object is first translated , then rotated • In (b) the object is rotated first and then translated (a) (b) Gursharan Singh Tatla

  21. General Composite transformations • A general 2D transformation representing a combination of translations, rotations and scalings are expressed as, • rsij represent multiplicative rotation-scaling terms , trsx and trsy are the translational terms containing combinations of translations and scaling parameters X Y 1 X’ Y’ 1 rsxx rsxy trsx rsyx rsyy trsy 0 0 1 = Gursharan Singh Tatla

  22. Composite transformations • For example , if an object is to be scaled and rotated about its center coordinates (xc,yc) and then translated , the composite transformation matrix looks like • T(tx,ty). R(xc,yc,θ) . S(xc, yc, sx, sy) = sxcosθ -sysinθ xc(1-sxcosθ) + yc sy sinθ +tx sxsin θ sycos θ yc(1-sycosθ) – xc sx sinθ + ty 0 0 1 Represents 9 multiplications and 6 additions Gursharan Singh Tatla

  23. Composite Transformations • The explicit calculation has only 4 multiplications and 4 additions x’ = x.rsxx + y.r sxy + tr sx y’ = x. rsyx + y. rsyy + tr sy • The efficient implementation is to • Formulate transformation matrices • Concatenate transformation sequence • Calculate transformed coordinates using the explicit equation shown above Gursharan Singh Tatla

  24. A general rigid body transformation matrix • A general rigid body transformation involving only translations and rotations can be expressed in the form rxx rxy trx ryx ryy try 0 0 1 Gursharan Singh Tatla

  25. Other transformations • Reflection is a transformation that produces a mirror image of an object. It is obtained by rotating the object by 180 deg about the reflection axis Reflection about the line y=0, the axis , is accomplished with the transformation matrix 1 Original position • 0 0 • 0 -1 0 • 0 0 1 3 2 2’ 3’ 1’ Reflected position Gursharan Singh Tatla

  26. Reflection -1 0 0 0 1 0 0 0 1 Original position Reflected position 2 2’ 1 1’ 3’ 3 Gursharan Singh Tatla

  27. Reflection -1 0 0 0 -1 0 0 0 1 Reflected position 3’ 2’ 1’ Reflection of an object relative to an axis perpendicular to the xy plane and passing through the coordinate origin 1 2 3 Original position Gursharan Singh Tatla

  28. Reflection of an object w.r.t the line y=x 0 1 0 1 0 0 0 0 1 Original position 3 2 1 1’ 3’ Reflected position 2’ Gursharan Singh Tatla

  29. Shear Transformations • Shear is a transformation that distorts the shape of an object such that the transformed shape appears as if the object were composed of internal layers that had been caused to slide over each other • Two common shearing transformations are those that shift coordinate x values and those that shift y values • An x direction shear relative to the x axis is produced with the transformation matrix Which transforms coordinate positions as X’ = x + shx.y y’ =y 1 shx 0 0 1 0 0 0 1 Gursharan Singh Tatla

  30. Shear tranformations (1,1) (2,1) (0,1) (1,1) (1/2,0) (0,0) (3/2,0) (1,0) Yref =-1 Yref =-1 We can generate x-direction shears relative to other referance lines with 1 shx -shx yref 0 1 0 0 0 1 With coordinate positions transformed as X’= x + shx (y - yref) y’ = y Gursharan Singh Tatla

  31. Shear transformation A y-direction shear relative to the line x = xref is generated with the transformation matrix This generates transformed coordinate positions X’ = x y’ = shy (x – xref) + y 1 0 0 Shy 1 -shy.xref 0 0 1 (1,2) (0,3/2) (0,1) (1,1) (1,1) (0,1/2) (1,0) (0,0) Xref = -1 Gursharan Singh Tatla

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